Multiply (5sqrt(19)) (6sqrt(2)) Give an exact answer
To multiply (5sqrt(19)) and (6sqrt(2)), we can multiply the numbers outside the square root and simplify:
(5sqrt(19))(6sqrt(2)) = (5*6)(sqrt(19)*sqrt(2))
= 30(sqrt(38))
Therefore, the exact answer is 30sqrt(38).
To multiply (5√19) and (6√2) and give an exact answer, we multiply the coefficients (numbers outside the square roots) and the numbers inside the square roots separately.
5 √19 × 6 √2 = (5 × 6) √(19 × 2)
= 30 √(38)
So, the exact answer is 30√38.
To multiply the expressions (5√19) and (6√2) together and get an exact answer, we can simply multiply the numerical coefficients and then multiply the square root terms.
Step 1: Multiply the numerical coefficients:
5 * 6 = 30
Step 2: Multiply the square root terms:
√19 * √2 = √(19 * 2) = √38
Putting it all together, the exact answer is:
30√38